Europa - Winkel zeichnen

Du siehst hier eine Landkarte von einem Teil Europas. Gekennzeichnet sind ein paar Städte Europas und ein paar Städte Verbindungen.[br][br]Probiere mit Hilfe der "Werkzeuge" [icon]/images/ggb/toolbar/mode_anglefixed.png[/icon] [b][i](Winkel mit fester Größe)[/i][/b] und [icon]/images/ggb/toolbar/mode_ray.png[/icon][b][i](Strahl)[/i][/b] die Aufgaben unten zu beantworten.[br][br]Bsp.: [i]Der Winkel geht von Istanbul über Ankara 24° im Uhrzeigersinn. Welche Stadt befindet sich auf dem Strahl?[br][/i][br][b][size=150]Vorgehensweise: [br][br][/size][/b]Werkzeugleiste des APPLETS: 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[/img][br][br][b][size=150]1.[/size][/b] Nutze das Werkzeug [icon]/images/ggb/toolbar/mode_anglefixed.png[/icon]: Klicke zunächst auf den Punkt von Istanbul, dann auf Ankara. Anschließend kommt ein Menü, wo Du Drehrichtung ([i]Gegen den Uhrzeigersinn oder IM Uhrzeigersinn)[/i] und die Winkelgröße auswählen kannst. --> Es entsteht [color=#ff7700]ein Punkt[/color] in gewünschter Drehrichtung mit dem richtigen Winkel.[br][b][size=150]2.[/size][/b] Zeichne anschließend einen Strahl [icon]/images/ggb/toolbar/mode_ray.png[/icon]ausgehend von [b]Scheitel in Richtung[/b] des gewünschten Winkels ([color=#ff7700][b]Punkt aus 1.)[/b][/color]. [br]Beantworte die Frage: Durch welche Stadt geht der Winkel/Strahl?
Winkel 1
Der Winkel geht von Istanbul über Ankara 24° im Uhrzeigersinn. Welche Stadt befindet sich auf dem Strahl?
Winkel 2
Der Winkel geht von Madrid über Lissabon  50°  gegen den Uhrzeigersinn. Welche Stadt befindet sich auf dem Strahl?
Winkel 3
Der Winkel geht von Barcelona über Rom 62° im Uhrzeigersinn. Welche Stadt befindet sich auf dem Strahl?
Winkel 4
Der Winkel geht von Mailand über Paris 18° gegen den Uhrzeigersinn. Welche Stadt befindet sich auf dem Strahl?
Winkel 5
Der Winkel geht von Sarajevo über München 43° gegen den Uhrzeigersinn. Welche Stadt befindet sich auf dem Strahl?
Winkel 6
Der Winkel geht von Prag über Wien 329° im Uhrzeigersinn. Welche Stadt befindet sich auf dem Strahl?
Winkel 7
Der Winkel geht von Athen über Sofia 41° gegen Uhrzeigersinn. Welche Stadt befindet sich auf dem Strahl?
Winkel 8
Der Winkel geht von Vilnius über Minsk 40° gegen den Uhrzeigersinn. Welche Stadt befindet sich auf dem Strahl?
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Information: Europa - Winkel zeichnen